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PROGRAM OVERVIEW
GLENCOE HIGH SCHOOL MATH
Connecting math content, rigor, and adaptive instruction for student success.
ALGEBRA 2
Connecting math content, rigor, and adaptive instruction for student success.
Program Overview + Digital Sampler
Confidently tailor your instruction with comprehensive materials to meet the individual learning needs of every student.
The accelerated pace of change in education over the last few years has created acute shifts in the delivery, consumption, and evaluation of mathematics education. As a result, educators need relevant content in multiple formats to engage students and focus on developing skills leading to achievement in the classroom and in the real-world.
Helping educators immerse students in math and prepare them for the future is what McGraw-Hill Education is all about. We deliver the most effective, innovative, and inspiring learning experiences for high school mathematics.
The Glencoe High School Math Series includes everything you need to guide your students with materials that lead them to success in the classroom, and creates confidence in their future.
Glencoe High School Math Series
Featuring Four Math Programs
AL
GE
BR
A 1
GLENCOE ALGEBRA 1GLE
NC
OE
FPO
connectED.mcgraw-hill.com
CONTENTS
CHAPTER 0 Preparing for Algebra
CHAPTER 1 Expressions and Functions
CHAPTER 2 Linear Equations
CHAPTER 3 Linear and Nonlinear Functions
CHAPTER 4 Equations of Linear Functions
CHAPTER 5 Linear Inequalities
CHAPTER 6 Systems of Linear Equations and Inequalities
CHAPTER 7 Exponents and Exponential Functions
CHAPTER 8 Polynomials
CHAPTER 9 Quadratic Functions and Equations
CHAPTER 10 Statistics
Glencoe’s High School Math Series is about connecting math content, rigor, and adaptive instruction for student success.
CARTERCUEVAS
DAYMALLOY
HOLLIDAYLUCHIN
mheducation.com/prek-12
ALGEBRA ALGEBRA 11GLE
NC
OE
connectED.mcgraw-hill.com
CONTENTS
CHAPTER 0 Preparing for Advanced Algebra
CHAPTER 1 Equations and Inequalities
CHAPTER 2 Linear Relations and Functions
CHAPTER 3 Systems of Equations and Inequalities
CHAPTER 4 Quadratic Functions and Relations
CHAPTER 5 Polynomials and Polynomial Functions
CHAPTER 6 Inverses and Radical Functions and Relations
CHAPTER 7 Exponential and Logarithmic Functions and Relations
CHAPTER 8 Rational Functions and Relations
CHAPTER 9 Conic Sections
CHAPTER 10 Sequences and Series
CHAPTER 11 Statistics and Probability
CHAPTER 12 Trigonometric Functions
CHAPTER 13 Trigonometric Identities and Equations
Glencoe’s High School Math Series is about connecting math content, rigor, and adaptive instruction for student success.
CARTERCUEVAS
DAYMALLOY
CUMMINSmheducation.com/prek-12
GE
OM
ET
RY
GLENCOE GEOMETRYGLE
NC
OE
FPO
GEOMETRYGEOMETRYGEOMETRYGEOMETRYGEOMETRYGEOMETRYGEOMETRYGEOMETRYGEOMETRYGEOMETRYGLE
NC
OE
GLE
NC
OE
AL
GE
BR
A 2
GLENCOE
connectED.mcgraw-hill.com
CONTENTS
CHAPTER 0 Preparing for Advanced Algebra
CHAPTER 1 Linear Equations
CHAPTER 2 Relations and Functions
CHAPTER 3 Quadratic Functions
CHAPTER 4 Polynomials and Polynomial Functions
CHAPTER 5 Inverses and Radical Functions
CHAPTER 6 Exponential and Logarithmic Functions
CHAPTER 7 Rational Functions
CHAPTER 8 Statistics and Probability
CHAPTER 9 Trigonometric Functions
CHAPTER 10 Trigonometric Identities and Equations
Glencoe’s High School Math Series is about connecting math content, rigor, and adaptive instruction for student success.
CARTERCUEVAS
DAYMALLOYCASEY
HOLLIDAYmheducation.com/prek-12
ALGEBRA 2GLE
NC
OE
FPO
ALGEBRA ALGEBRA 22GLE
NC
OE
GLE
NC
OE
CONTENTSPROGRAM OVERVIEWOverview . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 2–3
Connecting Math and Rigor . . . . . . . . . . . . . . . . . 4–5
Adaptive and Personalized Instruction . . . . . . . . . 6–7
Bring Math to Life . . . . . . . . . . . . . . . . . . . . . . . . . 8–9
Ensure Student Success . . . . . . . . . . . . . . . . . .10–11
Meeting Needs of All Students . . . . . . . . . . . . . 12-13
Open Education Resources . . . . . . . . . . . . . . . . . . . 13
DIGITAL RESOURCES GUIDEDigital Resource Guide . . . . . . . . . . . . . . . . . . . . . . 14
Your Digital Dashboard . . . . . . . . . . . . . . . . . . .15–16
Planning & Presentation . . . . . . . . . . . . . . . . . .17–18
Interactive Classroom . . . . . . . . . . . . . . . . . . . . . . . 19
eLessons . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 20
ALEKS® & LearnSmart . . . . . . . . . . . . . . . . . . .21–22
Chapter–Level Resources . . . . . . . . . . . . . . . . .23–32
Lesson–Level Resources . . . . . . . . . . . . . . . . . .33–47
Interactive Student Guide . . . . . . . . . . . . . . . . .48–52
Assessment Resources . . . . . . . . . . . . . . . . . . .53–75
Program Resources . . . . . . . . . . . . . . . . . . . . . .77–87
Professional Development . . . . . . . . . . . . . . . . .89–90
Get Ready for the Chapter
Connecting Concepts New Vocabulary
English Español
linear equation p. 155 ecuación lineal
standard form p. 155 forma estándar
constant p. 155 constante
x-intercept p. 156 intersección x
y-intercept p. 156 intersección y
linear function p. 163 función lineal
parent function p. 163 críe la functión
family of graphs p. 163 la familia de gráficas
root p. 163 raiz
rate of change p. 172 tasa de cambio
slope p. 174 pendiente
direct variation p. 182 variación directa
constant of variation p. 182 constante de variación
arithmetic sequence p. 189 sucesión arithmética
inductive reasoning p. 196 razonamiento inductivo
deductive reasoning p. 196 razonamiento deductivo
Review Vocabulary
origin origen the point where the two axes in a coordinate plane intersect with coordinates (0, 0)
x-axis eje x the horizontal number line on a coordinate plane
y-axis eje y the vertical number line on a coordinate plane
y
O x(0, 0)
y-axiseje y
originorigen x-axis
eje x
Concept Check Review the concepts used in this chapter by answering each question below.
1. The origin of something is where it begins. How does this definition relate to the origin of the coordinate plane?
2. In which quadrant are the x-values negative and y-values positive?
3. Point A has coordinates (2, 5). Name another point that has the same y-coordinate.
4. What is the inverse operation for subtraction?
5. Explain what step you would do first to solve 2x – 5 = 14.
6. What does it mean to solve an equation for a given variable?
7. Explain what it means to evaluate an expression.
8. What does it mean to find the absolute value of a number?
Performance Task PreviewYou can use the concepts and skills in this chapter to solve problems about running your own lawn-care business. Understanding linear functions will help you finish the Performance Task at the end of the chapter.
In this Performance Task you will:• model with mathematics• construct an argument• make use of structure
CHAPTER 3
Preparing for Assessment
Performance TaskProvide a clear solution to each part of the task. Be sure to show all of your work, include all relevant drawings, and justify your answers.
Part A With the Basic plan, homeowners pay each time Adrith mows their lawn. The table shows the total amount paid for number of service visits.
• What is the common difference?• Write an equation to represent the sequence.
Part B
Homeowners pay a $50 fee to sign up for the Premium plan, which includes both lawn mowing and trimming shrubs. The graph for the equation representing this plan goes through the points (1, 65) and (3, 95) where x represents the number of service visits and x represents the number of service visits and xy represents the total amount paid. y represents the total amount paid. y
• What is the slope for the Premium plan?• Write an equation in slope-intercept form to represent the total
amount paid for any number of service visits.
Part C
Compare the common difference for the sequence representing the Basic plan and the slope for the Premium plan.
• What does the common difference for the Basic plan represent?• What does the slope for the Premium plan represent?• Explain how the costs per service visit are related.
Part D
Graph the solutions of the equations for the Basic plan and Premium plan. Describe the change from the Basic plan to the Premium plan as a transformation of a linear function.
Part E
Construct an Argument For homeowners on the Basic plan, Adrith will trim shrubs for an additional charge of $5 each time. Describe an advantage of the Premium plan.
Part F
Structure Describe a transformation that would make the graph of the Premium plan steeper. Explain how the transformation affects the cost per service visit.
FINANCIAL LITERACY Adrith runs a lawn-mowing business for his neighbors. He has different plans homeowners can purchase based on their needs.
Number of visits 1 2 3 4
Amount paid ($) 15 30 45 60
230 | Chapter 3 | Preparing for Assessment
FPO
for Vocabulary Review Games and key vocabulary in 13 languages.
1-8. See margin.
C03_095A_XXXXXX
y
xO
P
152 | Chapter 3 | Linear and Nonlinear Functions
Get Ready for the Chapter
Connecting Concepts New Vocabulary
English Español
linear equation p. 155 ecuación lineal
standard form p. 155 forma estándar
constant p. 155 constante
x-intercept p. 156 intersección x
y-intercept p. 156 intersección y
linear function p. 163 función lineal
parent function p. 163 críe la functión
family of graphs p. 163 la familia de gráficas
root p. 163 raiz
rate of change p. 172 tasa de cambio
slope p. 174 pendiente
direct variation p. 182 variación directa
constant of variation p. 182 constante de variación
arithmetic sequence p. 189 sucesión arithmética
inductive reasoning p. 196 razonamiento inductivo
deductive reasoning p. 196 razonamiento deductivo
Review Vocabulary
origin origen the point where the two axes in a coordinate plane intersect with coordinates (0, 0)
x-axis eje x the horizontal number line on a coordinate plane
y-axis eje y the vertical number line on a coordinate plane
y
O x(0, 0)
y-axiseje y
originorigen x-axis
eje x
Concept Check Review the concepts used in this chapter by answering each question below.
1. The origin of something is where it begins. How does this definition relate to the origin of the coordinate plane?
2. In which quadrant are the x-values negative and y-values positive?
3. Point A has coordinates (2, 5). Name another point that has the same y-coordinate.
4. What is the inverse operation for subtraction?
5. Explain what step you would do first to solve 2x – 5 = 14.
6. What does it mean to solve an equation for a given variable?
7. Explain what it means to evaluate an expression.
8. What does it mean to find the absolute value of a number?
Performance Task PreviewYou can use the concepts and skills in this chapter to solve problems about running your own lawn-care business. Understanding linear functions will help you finish the Performance Task at the end of the chapter.
In this Performance Task you will:• model with mathematics• construct an argument• make use of structure
CHAPTER 3
Preparing for Assessment
Performance TaskProvide a clear solution to each part of the task. Be sure to show all of your work, include all relevant drawings, and justify your answers.
Part A With the Basic plan, homeowners pay each time Adrith mows their lawn. The table shows the total amount paid for number of service visits.
• What is the common difference?• Write an equation to represent the sequence.
Part B
Homeowners pay a $50 fee to sign up for the Premium plan, which includes both lawn mowing and trimming shrubs. The graph for the equation representing this plan goes through the points (1, 65) and (3, 95) where x represents the number of service visits and x represents the number of service visits and xy represents the total amount paid. y represents the total amount paid. y
• What is the slope for the Premium plan?• Write an equation in slope-intercept form to represent the total
amount paid for any number of service visits.
Part C
Compare the common difference for the sequence representing the Basic plan and the slope for the Premium plan.
• What does the common difference for the Basic plan represent?• What does the slope for the Premium plan represent?• Explain how the costs per service visit are related.
Part D
Graph the solutions of the equations for the Basic plan and Premium plan. Describe the change from the Basic plan to the Premium plan as a transformation of a linear function.
Part E
Construct an Argument For homeowners on the Basic plan, Adrith will trim shrubs for an additional charge of $5 each time. Describe an advantage of the Premium plan.
Part F
Structure Describe a transformation that would make the graph of the Premium plan steeper. Explain how the transformation affects the cost per service visit.
FINANCIAL LITERACY Adrith runs a lawn-mowing business for his neighbors. He has different plans homeowners can purchase based on their needs.
Number of visits 1 2 3 4
Amount paid ($) 15 30 45 60
230 | Chapter 3 | Preparing for Assessment
FPO
for Vocabulary Review Games and key vocabulary in 13 languages.
1-8. See margin.
C03_095A_XXXXXX
y
xO
P
152 | Chapter 3 | Linear and Nonlinear Functions
4
Be Empowered to Teach ConfidentlyRigor has a strong emphasis on conceptual understanding for encouraging critical thinking with students, and is embedded throughout the Glencoe High School Math Series.
Each chapter starts out with a preview of Performance Tasks. Concepts and skills are built upon throughout each chapter so that by the end students will be able to complete the rich multi-step tasks.
Connecting Math and Rigor
As your partner, we provide diverse resources focused on Standards for Mathematical Practices and challenge students’ critical thinking.
y
Ox
y
O x
y = b
x = a
(a, 0)
(0, b)
Study TipEquivalent Equations Rewriting equations by solving for y may make it easier to find values for y.
-x + 2y = 3 → y = x + 3 _ 2
Study Tip Sense-Making When
the x-coefficient is a fraction, select numbers from the domain that are multiples of the denominator. It will simplify your calculations.
To find the y-intercept, let x = 0.
2x + 4y = 16 Original equation
2(0) + 4y = 16 Replace x with 0.
4y = 16 Simplify.
y = 4 Divide each side by 4.
The y-intercept is 4. This means the graph intersects the y-axis at (0, 4).
Plot these two points and then draw a line through them.
Guided Practice
Graph each equation by using the x- and y-intercepts.
4A. -x + 2y = 3 4B. y = -x - 5
Note that the graph in Example 4 has both an x- and a y-intercept. Some lines have an x-intercept and no y-intercept or vice versa. The graph of y = b is a horizontal line that only has a y-intercept (unless b = 0). The intercept occurs at (0, b). The graph of x = a is a vertical line that only has an x-intercept (unless a = 0). The intercept occurs at (a, 0).
Every ordered pair that makes an equation true represents a point on the graph. So, the graph of an equation represents all of its solutions. Any ordered pair that does not make the equation true represents a point that is not on the line.
Graph y = 1 _ 3 x + 2. Then state the domain and the range.
The domain is all real numbers that can be written as D = {−∞ < x < ∞}. Select values from the domain and make a table. Create ordered pairs and graph them. The range is also all real numbers or R = {−∞ < y < ∞}.
x 1 _ 3
x + 2 y (x, y)
-3 1 _ 3 (-3) + 2 1 (-3, 1)
0 1 _ 3 (0) + 2 2 (0, 2)
3 1 _ 3 (3) + 2 3 (3, 3)
6 1 _ 3 (6) + 2 4 (6, 4)
y
O x
Guided Practice
Graph each equation by making a table. Then state the domain and the range.
5A. 2x - y = 2 5B. x = 3 5C. y = -2
Example 5 Graph by Making a Table
Program: ALG1 Component: C03_L01
PDF_ProofVendor: Aptara Grade: 9–12
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50. AMUSEMENT PARKS An amusement park charges $70 for admission before 6 p.m. and $25 for admission after 6 p.m. On Saturday, the park took in a total of $28,000.
a. Write an equation that represents the number of admissions that may have been sold. Let x represent the admissions sold before 6 p.m., and let y represent the admissions sold after 6 p.m.
b. Graph the equation. c. Find the x- and y-intercepts of the graph. What does each intercept represent?
Find the x-intercept and y-intercept of the graph of each equation.
5x + 3y = 15 52. 2x - 7y = 14 53. 2x - 3y = 5
54. 6x + 2y = 8 55. y = 1 _ 4 x - 3 56. y = 2 _
3 x + 1
57. AP EXAMS The percent of high school graduates who scored 3+ on AP Exams can be modeled by s = 26,811t + 246,402, where s is the number of high school students and t represents time in years since 2000.
a. Graph the equation and identify the t- and s-intercepts of the graph.
b. Use the graph to estimate the number of students receiving 3+ on the AP Exams in 2022.
58. MULTIPLE REPRESENTATIONS In this problem, you will explore x- and y-intercepts of graphs of linear equations.
a. Graphical If possible, use a straightedge to draw a line on a coordinate plane with each of the following characteristics.
x- and y-intercept
x-intercept, no y-intercept
exactly 2 x-intercepts
no x-intercept, y-intercept
exactly 2 y-intercepts
b. Analytical For which characteristics were you able to create a line and for which characteristics were you unable to create a line? Explain.
c. Verbal What must be true of the x- and y-intercepts of a line?
H.O.T. Problems Use Higher-Order Thinking Skills
59. REGULARITY Copy and complete each table. State whether any of the tables show a linear relationship. Explain.
Perimeter of a Square
Side Length Perimeter
1
2
3
4
Area of a Square
Side Length Area
1
2
3
4
Volume of a Cube
Side Length Volume
1
2
3
4
60. REASONING Compare and contrast the graphs of y = 2x + 1 with the domain {1, 2, 3, 4} and y = 2x + 1 with the domain of all real numbers.
OPEN-ENDED Give an example of a linear equation of the form Ax + By = C for each condition. Then describe the graph of the equation.
61. A = 0 62. B = 0 63. C = 0
64. WRITING IN MATH Explain how to find the x-intercept and y-intercept of a graph and summarize how to graph a linear equation.
51
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ALGEBRA 2GLE
NC
OE
INTERACTIVE STUDENT GUIDE
50. AMUSEMENT PARKS An amusement park charges $70 for admission before 6 p.m. and $25 for admission after 6 p.m. On Saturday, the park took in a total of $28,000.
a. Write an equation that represents the number of admissions that may have been sold. Let x represent the admissions sold before 6 p.m., and let y represent the admissions sold after 6 p.m.
b. Graph the equation. c. Find the x- and y-intercepts of the graph. What does each intercept represent?
Find the x-intercept and y-intercept of the graph of each equation.
5x + 3y = 15 52. 2x - 7y = 14 53. 2x - 3y = 5
54. 6x + 2y = 8 55. y = 1 _ 4 x - 3 56. y = 2 _
3 x + 1
57. AP EXAMS The percent of high school graduates who scored 3+ on AP Exams can be modeled by s = 26,811t + 246,402, where s is the number of high school students and t represents time in years since 2000.
a. Graph the equation and identify the t- and s-intercepts of the graph.
b. Use the graph to estimate the number of students receiving 3+ on the AP Exams in 2022.
58. MULTIPLE REPRESENTATIONS In this problem, you will explore x- and y-intercepts of graphs of linear equations.
a. Graphical If possible, use a straightedge to draw a line on a coordinate plane with each of the following characteristics.
x- and y-intercept
x-intercept, no y-intercept
exactly 2 x-intercepts
no x-intercept, y-intercept
exactly 2 y-intercepts
b. Analytical For which characteristics were you able to create a line and for which characteristics were you unable to create a line? Explain.
c. Verbal What must be true of the x- and y-intercepts of a line?
H.O.T. Problems Use Higher-Order Thinking Skills
59. REGULARITY Copy and complete each table. State whether any of the tables show a linear relationship. Explain.
Perimeter of a Square
Side Length Perimeter
1
2
3
4
Area of a Square
Side Length Area
1
2
3
4
Volume of a Cube
Side Length Volume
1
2
3
4
60. REASONING Compare and contrast the graphs of y = 2x + 1 with the domain {1, 2, 3, 4} and y = 2x + 1 with the domain of all real numbers.
OPEN-ENDED Give an example of a linear equation of the form Ax + By = C for each condition. Then describe the graph of the equation.
61. A = 0 62. B = 0 63. C = 0
64. WRITING IN MATH Explain how to find the x-intercept and y-intercept of a graph and summarize how to graph a linear equation.
51
Program: ALG1 Component: C03_L01
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y
Ox
y
O x
y = b
x = a
(a, 0)
(0, b)
Study TipEquivalent Equations Rewriting equations by solving for y may make it easier to find values for y.
-x + 2y = 3 → y = x + 3 _ 2
Study Tip Sense-Making When
the x-coefficient is a fraction, select numbers from the domain that are multiples of the denominator. It will simplify your calculations.
To find the y-intercept, let x = 0.
2x + 4y = 16 Original equation
2(0) + 4y = 16 Replace x with 0.
4y = 16 Simplify.
y = 4 Divide each side by 4.
The y-intercept is 4. This means the graph intersects the y-axis at (0, 4).
Plot these two points and then draw a line through them.
Guided Practice
Graph each equation by using the x- and y-intercepts.
4A. -x + 2y = 3 4B. y = -x - 5
Note that the graph in Example 4 has both an x- and a y-intercept. Some lines have an x-intercept and no y-intercept or vice versa. The graph of y = b is a horizontal line that only has a y-intercept (unless b = 0). The intercept occurs at (0, b). The graph of x = a is a vertical line that only has an x-intercept (unless a = 0). The intercept occurs at (a, 0).
Every ordered pair that makes an equation true represents a point on the graph. So, the graph of an equation represents all of its solutions. Any ordered pair that does not make the equation true represents a point that is not on the line.
Graph y = 1 _ 3 x + 2. Then state the domain and the range.
The domain is all real numbers that can be written as D = {−∞ < x < ∞}. Select values from the domain and make a table. Create ordered pairs and graph them. The range is also all real numbers or R = {−∞ < y < ∞}.
x 1 _ 3
x + 2 y (x, y)
-3 1 _ 3 (-3) + 2 1 (-3, 1)
0 1 _ 3 (0) + 2 2 (0, 2)
3 1 _ 3 (3) + 2 3 (3, 3)
6 1 _ 3 (6) + 2 4 (6, 4)
y
O x
Guided Practice
Graph each equation by making a table. Then state the domain and the range.
5A. 2x - y = 2 5B. x = 3 5C. y = -2
Example 5 Graph by Making a Table
Program: ALG1 Component: C03_L01
PDF_ProofVendor: Aptara Grade: 9–12
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The Interactive Student Guide* is an engaging resource that will help students be even more successful, and is included digitally with your Glencoe High School Math Series.
The Interactive Student Guide is standard-aligned and emphasizes on conceptual understanding and rigor.
Expand Mathematical Connections:
• Students can reflect on comprehension and application
• Internalize concepts to develop “second nature” recall
• Develop higher-order thinking skills
• Self-correct and discuss math concepts
• Demonstrate concept mastery
Standards for Mathematical Practice The goal of the Standards for Mathematical Practice is to help develop students to use critical thinking, procedural fluency and conceptual understanding.
• Teaching strategies for the Mathematical Practices are incorporated in each chapter of the Teachers Edition
• Mathematical Practice Study Tips are embedded in the margins of the Student Edition
• Questions throughout are labeled with a Mathematical Practice logo to help students make the correlations to those practices
*Available in Print and Digital
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Adaptive and Personalized Instruction
Personalized study resources your students need today – to master state assessments tomorrowLearnSmart® uses adaptive review with technology-enhanced questions to measure student accuracy, number of attempts, time spent, requests for help and confidence level to predict what course topics a student is most likely to forget and revisits those topics using engaging resources to build retention.
Glencoe High School Math Series has adaptive and personalized instructional tools built into the program, you can take command, make data-informed decisions, and provide the individualized instruction each student needs.
Adaptive and Personalized Instruction
Trust ALEKS® to make informed instructional decisionsWith the purchase of ALEKS* you are enabled to find out where your students are to inform your decisions on where whole-class instruction begins. This adaptive, personalized learning solution uses artificial intelligence to predict what content students are ready to learn and easily target individualized instruction, remediation, and acceleration.
* Contact your McGraw-Hill Education sales representative to learn how ALEKS can enhance your current math curriculum.
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Bring Math to Life
Draw out your students’ excitement for math with The Geometer’s Sketchpad®This interactive learning tool challenges students to drag, sketch, and model activities to deepen their conceptual understanding and application of abstract math concepts.
Integrated at the lesson level are engaging exercises that increase comprehension of abstract math concepts by helping students:
• Formalize key concepts
• Test mathematical hypothesis
• Visualize abstract math concepts
With the Glencoe High School Math Series digital resources in ConnectED, you can create an interactive learning center and empower students to live the math through exploration and investigation!
Personal Tutors are embedded and available to students at point-of-use to explain math concepts and help them apply or review lesson material.
Help students deepen their understanding of math with truly interactive resourcesThe eToolkit virtual manipulatives empowers students to take learning into their own hands with opportunities to modify concrete models and see how changes they make impact the formula.
BrainPOP® supports individual and whole-class learning with animations that provide clear and concise explanations of select topics. Students can’t help but be drawn in and you are fully supported with a variety of resources at your fingertips.
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DIG
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CHAPTER 3
Preparing for Assessment
Performance TaskProvide a clear solution to each part of the task. Be sure to show all of your work, include all relevant drawings, and justify your answers.
Part A With the Basic plan, homeowners pay each time Adrith mows their lawn. The table shows the total amount paid for number of service visits.
• What is the common difference? • Write an equation to represent the sequence.
Part B Homeowners pay a $50 fee to sign up for the Premium plan, which includes both lawn mowing and trimming shrubs. The graph for the equation representing this plan goes through the points (1, 65) and (3, 95) where x represents the number of service visits and y represents the total amount paid.
• What is the slope for the Premium plan? • Write an equation in slope-intercept form to represent the total
amount paid for any number of service visits.
Part C
Compare the common difference for the sequence representing the Basic plan and the slope for the Premium plan.
• What does the common difference for the Basic plan represent?• What does the slope for the Premium plan represent?• Explain how the costs per service visit are related.
Part D Graph the solutions of the equations for the Basic plan and Premium plan. Describe the change from the Basic plan to the Premium plan as a transformation of a linear function.
Part E Construct an Argument For homeowners on the Basic plan, Adrith will trim shrubs for an additional charge of $5 each time. Describe an advantage of the Premium plan.
Part F Structure Describe a transformation that would make the graph of the Premium plan steeper. Explain how the transformation affects the cost per service visit.
FINANCIAL LITERACY Adrith runs a lawn-mowing business for his neighbors. He has different plans homeowners can purchase based on their needs.
Number of visits 1 2 3 4
Amount paid ($) 15 30 45 60
Program: ALG1 Component: Performance Task
PDF_ProofVendor: Aptara Grade: 9–12
230 | Chapter 3 | Preparing for Assessment
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Preparing for Assessment
65. What are the x- and y-intercepts of the line shown in the graph? 2
C03_100A_140246
−4−6−8
8642
−4−6−8
2 4 6 8
y
xO
A �x-intercept is -4; y-intercept is -6.
B �x-intercept is -4; y-intercept is 6.
C �x-intercept is 6; y-intercept is -4.
D �x-intercept is 6; y-intercept is 6.
66. Which of the following shows the equation y = - 5 _ 8 x + 3 _
2 written in standard form?
2
A -5x - 8y = -12
B 5x + 8y = 24
C 5x + 8y = 12
D 8y = -5x + 12
67. Which of the following equations has the same y-intercept as the line shown in the graph?
1, 2
C03_101A_140246
−4−6−8
8642
−4−6−8
2 4 6 8
y
xO
A x - y = 4
B 3x - y = 6
C 2x + y = 4
D x + y = -2
68. MULTI-STEP A candle burns as shown in the graph. 1, 2, 8
C03-041A-888480_A
x
y
Hei
ght (
cm)
8
4
0
12141618202224
6
2
10
1 2 3 4 5 6 7 8 9Time (h)
Candle Height
a. Which of the following statements are true?
A �The graph is linear.
B �The graph is nonlinear.
C �The function is increasing.
D �The function is decreasing.
E � The function is neither increasing nor decreasing.
F �The function is positive.
G �The function is negative.
b. What is the x-intercept of the graph?
c. What is the y-intercept of the graph?
d. What do the intercepts represent?
e. If the height of the candle is 8 centimeters, approximately how long has the candle been burning?
A 0 hours
B 5 ��1 __ 2 � hours
C 8 hours
D 24 hours
Program: ALG1 Component: C03_L1_EOL
PDF_ProofVendor: Aptara Grade: 9–12
162 | Lesson 3-1 | Graphing Linear Functions
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10
Ensure Student Success
Promoting Conceptual UnderstandingPerformance Tasks are important to helping students learn concepts and skills. Each chapter has a preview of a performance task that will help students understand the concepts as they work through each lesson. Students will be asked to finish the task at the end of the chapter.
Modeling Through ReasoningPracticing reasoning and modeling is done in the Multi-Step Questions that are incorporated into the Preparing for Assessment page at the end of each lesson. Students can look for structure in different situations in the multi-step questions found throughout each lesson and chapter.
Students will be prepared to be successful on the new kinds of assessments that measure deeper understanding, critical-thinking, and problem-solving skills.
Use precise and customized tests with eAssessmentUsing eAssessment makes it easy to create customized assessments for your state’s content standards test practice, schedule homework, receive immediate results, and generate student proficiency reports.
Effectively and immediately provide support to improve achievement for every student.
Solutions with a Click of a ButtoneSolutions Manual replaces the traditional solutions manual with a digital version that you can access 24/7 and use to create custom reports. This manual allows for significantly more flexibility than the traditional solutions manual. You can create sets of answers or solutions for your own use or to help students assess their own work.
Using the “view online” feature in class allows you to project on a screen or interactive whiteboard in a presentation style. The questions are displayed one at a time and can be shown in steps to help students work the question as you project it.
ASSES
SMEN
TEN
GA
GEM
ENT
DIFFER
ENTIA
TEDIN
STR
UC
TION
RIG
OR
AD
AP
TIVE
11
DIG
ITAL
RES
OU
RC
ES
Engage
Aligned to this group Designed for this group
connectED.mcgraw-hill.com
Personalize
Differentiated Resources Featured IWB Resources
VocabularyALEKS The Geometer’sSketchpad
LearnSmart AnimationsTools CalculatorResources
Self-CheckPractice
Personal Tutor
Geometer’s Sketchpad provides students with a tangible, visual way to learn. Use with Lessons 3-3 and 3-4.
eLessons engage students and help build conceptual understanding of big ideas. Use with Lessons 3-1 through 3-4.
Animations help students make important connections through motion. Use with Lesson 3-1.
Time Management How long will it take to use these resources? Look for the clock in each lesson interleaf.
FOR EVERY CHAPTER AL OL BL ELL
Chapter Readiness Quizzes
Chapter Tests
Standardized Test Practice
Vocabulary Review Games
Anticipation Guide (English/Spanish)
Student-Built Glossary
Chapter Project
FOR EVERY LESSON AL OL BL ELL
Personal Tutors (English/Spanish)
Graphing Calculator Personal Tutors
Step-by-Step Solutions
Self-Check Quizzes
5-Minute Check
Study Notebook
Study Guide and Intervention
Skills Practice (English/Spanish)
Practice (English/Spanish)
Word Problem Practice
Enrichment
Extra Examples
Interactive Classroom
Customize Your ChapterUse the Plan & Present, Assignment Tracker, and Assessment tools in ConnectED to introduce lesson concepts, assign personalized practice, and diagnose areas of student need.
Differentiated InstructionThroughout the program, look for the icons to find specialized content designed for your students.
AL Approaching LevelOL On LevelBL Beyond Level
ELL English Language Learners
connectED.mcgraw-hill.com 150B
McG
raw
-Hill
Edu
catio
n
12
Meeting Needs of All Students
Confidently tailor your instruction with comprehensive materials to meet the individual learning needs of every student.
Built-In Differentiated InstructionGlencoe’s High School Series fully supports the 3-tier RtI model with print and digital resources to diagnose students, identify areas of need, and conduct short, frequent assessments for accurate data-driven decision making. Every lesson provides easy-to-use resources that consider the needs of all students.
Comprehensive resources are found throughout the program.
• Teacher Edition with strategies to modify activities and lesson content.
• Multilingual eGlossary with definitions for each vocabulary word in 13 languages
Response to InterventionUse the Intervention Planner to help you determine your Response to Intervention.
Intervention Planner
1 On Level OL
IF students miss 25% of the exercises or less,
THEN choose a resource:
SE Lessons 5-1, 5-2, and 5-3
Skills Practice
Chapter Project
Self-Check Quizzes
2 Strategic Intervention AL
Approaching grade level
IF students miss 50% of the exercises,
THEN choose a resource:
Quick Review Math Handbook
Study Guide and Intervention
Extra Examples
Personal Tutors
Homework Help
3 Intensive Intervention2 or more grades below level
IF students miss 75% of the exercises,
THEN choose a resource:
Use Math Triumphs, Alg. 1
Extra Examples
Personal Tutors
Homework Help
Review Vocabulary
Foldables Study Organizer
Dinah Zike’s
Before students complete the Mid-Chapter Quiz, encourage them to review the information for Lessons 5-1 through 5-3 in their Foldables.
Students may benefit from sharing their Foldable with a partner and taking turns summarizing what they have learned about inequalities, while the other partner listens carefully. They should seek clarification of any concepts, as needed.
ELL ELPS c.1.D, c.2.D(2), c.2.I(3), c.2.I(5), c.3.E, c.4.D, c.4.F(2), c.4.F(7), c.4.F(9), c.4.G(2), c.4.G(4)eAssessment
You can use the pre-made Mid-Chapter Test to assess students’ progress in the first half of the chapter. Customize and create multiple versions of your Mid-Chapter Quiz and answer keys that align to the TEKS. Tests can be delivered on paper or online.
ALEKS can be used as a formative assessment tool to target learning gaps for those who are struggling, while providing enhanced learning for those who have mastered the concepts.
Mid-Chapter QuizLessons 5-1 through 5-3
Solve each inequality. Then graph it on a number line. (Lesson 5-1) 1–4. See Ch. 5 Answer Appendix.
1. x - 8 > 4 2. m + 2 ≥ 6
3. p - 4 < -7 4. 12 ≤ t - 9
5. CONCERTS Lupe’s allowance for the month is $60. She wants to go to a concert for which a ticket costs $45. (Lesson 5-1)
a. Write and solve an inequality that shows how much money she can spend that month after buying a concert ticket. m+ 45 ≤ 60; m≤ 15
b. She spends $9.99 on music downloads and $2on lunch in the cafeteria. Write and solve aninequality that shows how much she can spendafter these purchases and the concert ticket.
Define a variable, write an inequality, and solve each problem. Check your solution. (Lesson 5-1)
6. The sum of a number and -2 is no more than 6.
7. A number decreased by 4 is more than -1.
8. Twice a number increased by 3 is less than the number decreased by 4.
9. MULTIPLE CHOICE Jane is saving money to buy a new smartphone that costs no more than $150. So far, she has saved $82. How much more money does Jane need to save? (Lesson 5-1) C
A $68
B more than $68
C no more than $68
D at least $68
Solve each inequality. Check your solution. (Lesson 5-2)
10. 1_3
y ≥ 5 y≥ 15 11. 4 < c_5c> 20
12. -8x > 24 x< -3 13. 2m ≤ -10 m≤ -5
14. x_2
<5_8x<
5_4
15. -9a ≥ -45 a≤ 5
16. w_6
> -3 w> -18 17. k_7
< -2 k< -14
m+ 45 + 9.99 + 2 ≤ 60; m≤ 3.01
6–8. See Ch. 5 Answer Appendix.
18. ANIMALS Black-tailed prairie dogs are commonly found around lakes in the Texas Panhandle. Adults can be up to 21 inches long, including their tail, and weigh up to 3 pounds.
a. Write inequalities to describe the ranges in thelengths and weights of black-tailed prairie dogs.
b. If a black-tailed prairie dog’s tail is one seventh of its total length, write and solve an inequality that describes the range of lengths of black-tailed prairie dogs’ tails.
19. GARDENING Bill is building a fence around a square garden to keep deer out. He has 60 feet of fencing. Find the maximum length of a side of the garden. (Lesson 5-2)
Solve each inequality. Check your solution. (Lesson 5-3)
20. 4a - 2 > 14 a> 4
21. 2x + 11 ≤ 5x - 10 x≥ 7
22. -p + 4 < -9 p> 13
23. d_4
+ 1 ≥ -3 d≥ -16
24. -2(4b + 1) < -3b + 8 b> -2
Define a variable, write an inequality, and solve each problem. Check your solution. (Lesson 5-3)
25. Three times a number increased by 8 is no more than the number decreased by 4.
26. Two thirds of a number plus 5 is greater than 17.
27. MULTIPLE CHOICE Shoe rental costs $2, and each game bowled costs $3. How many games can Kyle bowl without spending more than $15? (Lesson 5-3) H
F 2 H 4
G 3 J 5
0 < � ≤ 21; 0 <w≤ 3
0 < 7�≤ 21; 0 < �≤ 3
x≤ 15; at most 15 ft on each side
25–26. See Ch. 5 Answer Appendix.
Program: TX_ALG1 TE Component: MCQ
PDF PassVendor: Quad Graphics Grade: 9–12
Chapter 5 Mid-Chapter Quiz
304 | Chapter 5 | Mid-Chapter Quiz
0304_ALG1_T_C05_L03_MCQ_140111.indd 304 1/13/14 11:23 AM
Response to InterventionUse the Intervention Planner to help you determine your Response to Intervention.
Intervention Planner
1 On Level OL
IF students miss 25% of the exercises or less,
THEN choose a resource:
SE Lessons 5-1, 5-2, and 5-3
Skills Practice
Chapter Project
Self-Check Quizzes
2 Strategic Intervention AL
Approaching grade level
IF students miss 50% of the exercises,
THEN choose a resource:
Quick Review Math Handbook
Study Guide and Intervention
Extra Examples
Personal Tutors
Homework Help
3 Intensive Intervention 2 or more grades below level
IF students miss 75% of the exercises,
THEN choose a resource:
Use Math Triumphs, Alg. 1
Extra Examples
Personal Tutors
Homework Help
Review Vocabulary
Foldables Study Organizer
Dinah Zike’s
Before students complete the Mid-Chapter Quiz, encourage them to review the information for Lessons 5-1 through 5-3 in their Foldables.
Students may benefit from sharing their Foldable with a partner and taking turns summarizing what they have learned about inequalities, while the other partner listens carefully. They should seek clarification of any concepts, as needed.
ELL ELPS c.1.D, c.2.D(2), c.2.I(3), c.2.I(5), c.3.E, c.4.D, c.4.F(2), c.4.F(7), c.4.F(9), c.4.G(2), c.4.G(4)eAssessment
You can use the pre-made Mid-Chapter Test to assess students’ progress in the first half of the chapter. Customize and create multiple versions of your Mid-Chapter Quiz and answer keys that align to the TEKS. Tests can be delivered on paper or online.
ALEKS can be used as a formative assessment tool to target learning gaps for those who are struggling, while providing enhanced learning for those who have mastered the concepts.
Mid-Chapter QuizLessons 5-1 through 5-3
Solve each inequality. Then graph it on a number line. (Lesson 5-1) 1–4. See Ch. 5 Answer Appendix.
1. x - 8 > 4 2. m + 2 ≥ 6
3. p - 4 < -7 4. 12 ≤ t - 9
5. CONCERTS Lupe’s allowance for the month is $60. She wants to go to a concert for which a ticket costs $45. (Lesson 5-1)
a. Write and solve an inequality that shows how much money she can spend that month after buying a concert ticket. m+ 45 ≤ 60; m≤ 15
b. She spends $9.99 on music downloads and $2on lunch in the cafeteria. Write and solve aninequality that shows how much she can spendafter these purchases and the concert ticket.
Define a variable, write an inequality, and solve each problem. Check your solution. (Lesson 5-1)
6. The sum of a number and -2 is no more than 6.
7. A number decreased by 4 is more than -1.
8. Twice a number increased by 3 is less than the number decreased by 4.
9. MULTIPLE CHOICE Jane is saving money to buy a new smartphone that costs no more than $150. So far, she has saved $82. How much more money does Jane need to save? (Lesson 5-1) C
A $68
B more than $68
C no more than $68
D at least $68
Solve each inequality. Check your solution. (Lesson 5-2)
10. 1_3
y ≥ 5 y≥ 15 11. 4 < c_5c> 20
12. -8x > 24 x< -3 13. 2m ≤ -10 m≤ -5
14. x_2
<5_8x<
5_4
15. -9a ≥ -45 a≤ 5
16. w_6
> -3 w> -18 17. k_7
< -2 k< -14
m+ 45 + 9.99 + 2 ≤ 60; m≤ 3.01
6–8. See Ch. 5 Answer Appendix.
18. ANIMALS Black-tailed prairie dogs are commonly found around lakes in the Texas Panhandle. Adults can be up to 21 inches long, including their tail, and weigh up to 3 pounds.
a. Write inequalities to describe the ranges in thelengths and weights of black-tailed prairie dogs.
b. If a black-tailed prairie dog’s tail is one seventh of its total length, write and solve an inequality that describes the range of lengths of black-tailed prairie dogs’ tails.
19. GARDENING Bill is building a fence around a square garden to keep deer out. He has 60 feet of fencing. Find the maximum length of a side of the garden. (Lesson 5-2)
Solve each inequality. Check your solution. (Lesson 5-3)
20. 4a - 2 > 14 a> 4
21. 2x + 11 ≤ 5x - 10 x≥ 7
22. -p + 4 < -9 p> 13
23. d_4
+ 1 ≥ -3 d≥ -16
24. -2(4b + 1) < -3b + 8 b> -2
Define a variable, write an inequality, and solve each problem. Check your solution. (Lesson 5-3)
25. Three times a number increased by 8 is no more than the number decreased by 4.
26. Two thirds of a number plus 5 is greater than 17.
27. MULTIPLE CHOICE Shoe rental costs $2, and each game bowled costs $3. How many games can Kyle bowl without spending more than $15? (Lesson 5-3) H
F 2 H 4
G 3 J 5
0 < � ≤ 21; 0 <w≤ 3
0 < 7�≤ 21; 0 < �≤ 3
x≤ 15; at most 15 ft on each side
25–26. See Ch. 5 Answer Appendix.
Program: TX_ALG1 TE Component: MCQ
PDF PassVendor: Quad Graphics Grade: 9–12
Chapter 5 Mid-Chapter Quiz
304 | Chapter 5 | Mid-Chapter Quiz
0304_ALG1_T_C05_L03_MCQ_140111.indd 304 1/13/14 11:23 AM
Response to InterventionUse the Intervention Planner to help you determine your Response to Intervention.
Intervention Planner
1 On Level OL
IF students miss 25% of the exercises or less,
THEN choose a resource:
SE Lessons 5-1, 5-2, and 5-3
Skills Practice
Chapter Project
Self-Check Quizzes
2 Strategic Intervention AL
Approaching grade level
IF students miss 50% of the exercises,
THEN choose a resource:
Quick Review Math Handbook
Study Guide and Intervention
Extra Examples
Personal Tutors
Homework Help
3 Intensive Intervention2 or more grades below level
IF students miss 75% of the exercises,
THEN choose a resource:
Use Math Triumphs, Alg. 1
Extra Examples
Personal Tutors
Homework Help
Review Vocabulary
Foldables Study Organizer
Dinah Zike’s
Before students complete the Mid-Chapter Quiz, encourage them to review the information for Lessons 5-1 through 5-3 in their Foldables.
Students may benefit from sharing their Foldable with a partner and taking turns summarizing what they have learned about inequalities, while the other partner listens carefully. They should seek clarification of any concepts, as needed.
ELL ELPS c.1.D, c.2.D(2), c.2.I(3), c.2.I(5), c.3.E, c.4.D, c.4.F(2), c.4.F(7), c.4.F(9), c.4.G(2), c.4.G(4)eAssessment
You can use the pre-made Mid-Chapter Test to assess students’ progress in the first half of the chapter. Customize and create multiple versions of your Mid-Chapter Quiz and answer keys that align to the TEKS. Tests can be delivered on paper or online.
ALEKS can be used as a formative assessment tool to target learning gaps for those who are struggling, while providing enhanced learning for those who have mastered the concepts.
Mid-Chapter QuizLessons 5-1 through 5-3
Solve each inequality. Then graph it on a number line. (Lesson 5-1) 1–4. See Ch. 5 Answer Appendix.
1. x - 8 > 4 2. m + 2 ≥ 6
3. p - 4 < -7 4. 12 ≤ t - 9
5. CONCERTS Lupe’s allowance for the month is $60. She wants to go to a concert for which a ticket costs $45. (Lesson 5-1)
a. Write and solve an inequality that shows how much money she can spend that month after buying a concert ticket. m+ 45 ≤ 60; m≤ 15
b. She spends $9.99 on music downloads and $2on lunch in the cafeteria. Write and solve aninequality that shows how much she can spendafter these purchases and the concert ticket.
Define a variable, write an inequality, and solve each problem. Check your solution. (Lesson 5-1)
6. The sum of a number and -2 is no more than 6.
7. A number decreased by 4 is more than -1.
8. Twice a number increased by 3 is less than the number decreased by 4.
9. MULTIPLE CHOICE Jane is saving money to buy a new smartphone that costs no more than $150. So far, she has saved $82. How much more money does Jane need to save? (Lesson 5-1) C
A $68
B more than $68
C no more than $68
D at least $68
Solve each inequality. Check your solution. (Lesson 5-2)
10. 1_3
y ≥ 5 y≥ 15 11. 4 < c_5c> 20
12. -8x > 24 x< -3 13. 2m ≤ -10 m≤ -5
14. x_2
<5_8x<
5_4
15. -9a ≥ -45 a≤ 5
16. w_6
> -3 w> -18 17. k_7
< -2 k< -14
m+ 45 + 9.99 + 2 ≤ 60; m≤ 3.01
6–8. See Ch. 5 Answer Appendix.
18. ANIMALS Black-tailed prairie dogs are commonly found around lakes in the Texas Panhandle. Adults can be up to 21 inches long, including their tail, and weigh up to 3 pounds.
a. Write inequalities to describe the ranges in thelengths and weights of black-tailed prairie dogs.
b. If a black-tailed prairie dog’s tail is one seventh of its total length, write and solve an inequality that describes the range of lengths of black-tailed prairie dogs’ tails.
19. GARDENING Bill is building a fence around a square garden to keep deer out. He has 60 feet of fencing. Find the maximum length of a side of the garden. (Lesson 5-2)
Solve each inequality. Check your solution. (Lesson 5-3)
20. 4a - 2 > 14 a> 4
21. 2x + 11 ≤ 5x - 10 x≥ 7
22. -p + 4 < -9 p> 13
23. d_4
+ 1 ≥ -3 d≥ -16
24. -2(4b + 1) < -3b + 8 b> -2
Define a variable, write an inequality, and solve each problem. Check your solution. (Lesson 5-3)
25. Three times a number increased by 8 is no more than the number decreased by 4.
26. Two thirds of a number plus 5 is greater than 17.
27. MULTIPLE CHOICE Shoe rental costs $2, and each game bowled costs $3. How many games can Kyle bowl without spending more than $15? (Lesson 5-3) H
F 2 H 4
G 3 J 5
0 < � ≤ 21; 0 <w≤ 3
0 < 7�≤ 21; 0 < �≤ 3
x≤ 15; at most 15 ft on each side
25–26. See Ch. 5 Answer Appendix.
Program: TX_ALG1 TE Component: MCQ
PDF PassVendor: Quad Graphics Grade: 9–12
Chapter 5 Mid-Chapter Quiz
304 | Chapter 5 | Mid-Chapter Quiz
0304_ALG1_T_C05_L03_MCQ_140111.indd 304 1/13/14 11:23 AM
LESSON 3-1
Graphing Linear Functions
NOWTHEN NEXT
eLessons utilize the power of your interactive whiteboard in an engaging way. Use Linear Functions, screens 2–5, to introduce the concepts in this lesson.
Use at Beginning of Lesson
Animations illustrate key concepts through step-by-step tutorials and videos.
Use with Examples
Graphing Tools are outstanding tools for enhancing understanding.
Use with Examples
All of these resources and more are available at connectED.mcgraw-hill.com
A.3(A) Students will determine the slope of a line given a table of values, a graph, two points on the line, and an equation written in various forms, including y = mx + b, Ax + By = C, and y - y 1 = m(x - x 1 ).
A.3(B) Students will calculate the rate of change of a linear function represented tabularly, graphically, or algebraically in context of mathematical and real-world problems.
A.2(B) Students will write linear equations in two variables in various forms, including y = mx + b, Ax + By = C, and y - y 1 = m(x - x 1 ), given one point and the slope and given two points.
A.3(C) Students will graph linear functions on the coordinate plane and identify key features, including x-intercept, y-intercept, zeros, and slope, in mathematical and real-world problems. Also addresses A.2 (A)
A.2(A) Students determined the domain and range of linear functions in mathematical problems.
A.12(A) Students decided whether relations represented verbally, tabularly, graphically, and symbolically define a function.
Mathematical BackgroundAn equation is linear if the Properties of Equality can be applied to rewrite it in standard form. The graph of a linear function has at most one x-intercept and one y-intercept. The intercepts can be found by alternately replacing x and y with 0. Values of x for which y = 0 are called zeros. A zero is an x-intercept.
Objectives Identify linear equations, intercepts, and zeros.
Graph linear equations.
Using Open Educational ResourcesApps Have students access Google Apps for Education to collaborate on tips for graphing linear equations. As an educator it also offers spreadsheets, calendars, and surveys. You can also try WhoTeaches, or TeachAde. Use as planning tool
SUGGESTED PACING (DAYS)
Explore Lab Instruction
45 min.
90 min. 0.50.5
0.50.5
Track Your Progress
connectED.mcgraw-hill.com 153A
McG
raw
-Hill
Edu
catio
n
LESSON 3-1
Graphing Linear Functions
NOWTHEN NEXT
eLessons utilize the power of your interactive whiteboard in an engaging way. Use Linear Functions, screens 2–5, to introduce the concepts in this lesson.
Use at Beginning of Lesson
Animations illustrate key concepts through step-by-step tutorials and videos.
Use with Examples
Graphing Tools are outstanding tools for enhancing understanding.
Use with Examples
All of these resources and more are available at connectED.mcgraw-hill.com
A.3(A) Students will determine the slope of a line given a table of values, a graph, two points on the line, and an equation written in various forms, including y = mx + b, Ax + By = C, and y - y1 = m(x - x1 ).
A.3(B) Students will calculate the rate ofchange of a linear function representedtabularly, graphically, or algebraically in contextof mathematical and real-world problems.
A.2(B) Students will write linear equations intwo variables in various forms, includingy = mx + b, Ax + By = C, and y - y1 = m(x - x1 ),given one point and the slope and given twopoints.
A.3(C) Students will graph linear functions onthe coordinate plane and identify key features,including x-intercept, y-intercept, zeros, andslope, in mathematical and real-world problems.Also addresses A.2 (A)
A.2(A) Students determined the domain and range of linear functions in mathematical problems.
A.12(A) Students decided whether relations represented verbally, tabularly, graphically, and symbolically define a function.
Mathematical BackgroundAn equation is linear if the Properties of Equality can be applied to rewrite it in standard form. The graph of a linear function has at most one x-intercept and one y-intercept. The intercepts can be found by alternately replacing x and y with 0. Values of x for which y = 0 are called zeros. A zero is an x-intercept.
Objectives Identify linear equations, intercepts, and zeros.
Graph linear equations.
Using Open Educational ResourcesApps Have students access Google Apps for Education to collaborate on tips for graphing linear equations. As an educator it also offers spreadsheets, calendars, and surveys. You can also try WhoTeaches, or TeachAde. Use as planning tool
SUGGESTED PACING (DAYS)
Explore Lab Instruction
45 min.
90 min. 0.50.5
0.50.5
Track Your Progress
connectED.mcgraw-hill.com 153A
McG
raw
-Hill
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Spark excitement about the impact of math in the real world using these Differentiated Instruction resources:
• Recommendations to personalize instruction for every student.
• Leveled exercise sets, reference resources, and dynamic digital tools.
• Differentiated homework options.
• English Learner and Vocabulary tips throughout each lesson thatconnect the math meaning to every day meaning
Using Glencoe High School Math Series’ 3-Tier RTI model to reach every student
Using Open Education Resources With our ConnectED platform, teachers who have created their own resources are able to upload them into the Glencoe High School Math Series. They can assign them to students or add to their customized Lesson Presentations.
Teachers can reference the OER suggestions in the planning pages before each lesson in their Teacher’s Edition.
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mheonline.com/hsmath